On the Injectivity of the Shifted Funk-Radon Transform and Related Harmonic Analysis
Abstract
Necessary and sufficient conditions are obtained for injectivity of the shifted Funk-Radon transform associated with k-dimensional totally geodesic submanifolds of the unit sphere Sn in Rn+1. This result generalizes the well known statement for the spherical means on Sn and is formulated in terms of zeros of Jacobi polynomials. The relevant harmonic analysis is developed, including a new concept of induced Stiefel (or Grassmannian) harmonics, the Funk-Hecke type theorems, addition formula, and multipliers. Some perspectives and conjectures are discussed.
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